Test blog for MathJax
Gravitational force \(\displaystyle \vec{F}=-\frac{GMm}{r^2}\hat{r}\)
Gauss's theorem
\[\oint \vec{E}\cdot\rm{d}\vec{A}=\frac{Q}{\epsilon_0}\]
Here is a numbered equation
\begin{equation}
\int_0^\infty \frac{x^3}{e^x-1}\,dx = \frac{\pi^4}{15}
\label{eq:sample}
\end{equation}
We can also refer equation number like \eqref{eq:sample}
This is working, So I will write how to use mathjax in blogger in detail in later post.
Source: http://weiqigao.blogspot.co.uk/2013/03/enabling-mathjax-in-blogger.html
Cheers
APaul
Gauss's theorem
\[\oint \vec{E}\cdot\rm{d}\vec{A}=\frac{Q}{\epsilon_0}\]
Here is a numbered equation
\begin{equation}
\int_0^\infty \frac{x^3}{e^x-1}\,dx = \frac{\pi^4}{15}
\label{eq:sample}
\end{equation}
We can also refer equation number like \eqref{eq:sample}
This is working, So I will write how to use mathjax in blogger in detail in later post.
Source: http://weiqigao.blogspot.co.uk/2013/03/enabling-mathjax-in-blogger.html
Cheers
APaul
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